Colloquium – Rosa Orellana (Dartmouth College)
ZoomTITLE: Products of characters of the symmetric group ABSTRACT: One of the main open problems in combinatorial representation theory of the symmetric group is to obtain a combinatorial interpretation for what are known as the Kronecker coefficients. The Kronecker coefficients are obtained when we decompose the tensor product of two irreducible representations of the symmetric
Algebra/Topology Seminar – Heather Werth (University of Alabama)
346 Gordon Palmer Hall 505 Hackberry Lane, Tuscaloosa, AL, United StatesTitle: Computation of extension spaces in $kQ$-mod, for $kQ$ the path algebra of a quiver $Q$ of type $\tilde A(n-1,1)$, using planar curves. Abstract: The representation theory of quivers is important to the representation theory of associative algebras in general. If $Q$ is a quiver of affine type $\tilde A(n-1,1)$ and $k$ a fixed algebraically
Analysis Seminar – David Cruz-Uribe (University of Alabama)
ZoomTitle: Matrix weights, the convex-set valued maximal operator, and Rubio de Francia extrapolation part 3. Abstract: In this series of talks, I want to talk about the theory of matrix weights: its history and motivation, and some recent results by myself, Kabe Moen, and others. The ultimate goal is to give an overview of my
Algebra/Topology Seminar – Jonathan Simone (Georgia Institute of Technology)
ZoomTitle: The non-orientable 4-ball genus of torus knots Abstract: The non-orientable 4-ball genus of a knot $K$ in $S^3$ is the minimal first Betti number of any smoothly embedded non-orientable surface in $B^4$ bounded by K. This is the non-orientable analog of the 4-ball genus of $K$ (i.e. the minimal genus of any smooth orientable surface
Analysis Seminar – David Cruz-Uribe (University of Alabama)
ZoomTitle: Matrix weights, the convex-set valued maximal operator, and Rubio de Francia extrapolation part 4. Abstract: In this series of talks, I want to talk about the theory of matrix weights: its history and motivation, and some recent results by myself, Kabe Moen, and others. The ultimate goal is to give an overview of my
AWM Lunch and Learn – Mathematics Through Art History
228 Gordon Palmer Hall Tuscaloosa, AL, United StatesThe UA chapter of the AWM is hosting a Lunch and Learn session on Tuesday, October 12 from 11 a.m. to 12 p.m. in GP 228. Join us to learn about mathematics throughout art history! Individually packaged lunches will be provided to those who RSVP by October 9, 2021.
Algebra/Topology Seminar – Surena Hozoori (Georgia Tech)
ZoomTitle: On Anosovity, divergence and bi-contact surgery Abstract: I will revisit the relation between Anosov 3-flows and invariant volume forms, from a contact geometric point of view. Consequently, I will give a contact geometric characterization of when a flow with dominated splitting is Anosov based on its divergence, as well as a Reeb dynamical interpretation
Colloquium – David Goldberg (Math Alliance, Purdue University)
ZoomAbstract: The National Alliance for Doctoral Studies in the Mathematical Sciences, more commonly known as the Math Alliance, grew out of an earlier NSF Funded project, The Alliance for the Production of African American PhDs in the Mathematical Sciences. In 2006 this project transformed itself to have a national scope, and it has been growing
Analysis Seminar – Walton Green (Washington University)
ZoomTitle: Wavelet Representation of Smooth Calderón-Zygmund Operators Abstract: We represent a bilinear Calderón-Zygmund operator at a given smoothness level as a finite sum of cancellative, complexity zero operators, involving smooth wavelet forms, and continuous paraproduct forms. This representation results in a sparse T(1)-type bound, which in turn yields directly new sharp weighted linear and mutlilinear
Algebra/Topology Seminar – Subhankar Dey (University of Alabama)
346 Gordon Palmer Hall 505 Hackberry Lane, Tuscaloosa, AL, United StatesTitle: Detection results in link Floer homology Abstract: In this talk I will briefly describe link Floer homology toolbox and its usefulness. Then I will show how link Floer homology can detect links with small ranks, using a rank bound for fibered links by generalizing an existing result for knots. I will also show that stronger